期刊文献+

Pseudo analytical solution to time periodic stiffness systems

Pseudo analytical solution to time periodic stiffness systems
下载PDF
导出
摘要 An analytical form of state transition matrix for a system of equations with time periodic stiffness is derived in order to solve the free response and also allow for the determination of system stability and bifurcation. A pseudoclosed form complete solution for parametrically excited systems subjected to inhomogeneous generalized forcing is developed, based on the Fourier expansion of periodic matrices and the substitution of matrix exponential terms via Lagrange-Sylvester theorem. A Mathieu type of equation with large amplitude is presented to demonstrate the method of formulating state transition matrix and Floquet multipliers. A two-degree-of-freedom system with irregular time periodic stiffness characterized by spiral bevel gear mesh vibration is presented to find forced response in stability and instability. The obtained results are presented and discussed. An analytical form of state transition matrix for a system of equations with time periodic stiffness is derived in order to solve the free response and also allow for the determination of system stability and bifurcation. A pseudoclosed form complete solution for parametrically excited systems subjected to inhomogeneous generalized forcing is developed, based on the Fourier expansion of periodic matrices and the substitution of matrix exponential terms via Lagrange-Sylvester theorem. A Mathieu type of equation with large amplitude is presented to demonstrate the method of formulating state transition matrix and Floquet multipliers. A two-degree-of-freedom system with irregular time periodic stiffness characterized by spiral bevel gear mesh vibration is presented to find forced response in stability and instability. The obtained results are presented and discussed.
出处 《Chinese Physics B》 SCIE EI CAS CSCD 2011年第4期97-102,共6页 中国物理B(英文版)
基金 supported by the National Natural Science Foundation of China (Grant No. 50875009) the Defense Industrial Technology Development Program of China (Grant No. B0620060424) the Aviation Science Foundation of China (Grant No. 20090451009)
关键词 parametric excitation time periodic stiffness STABILITY RESPONSE parametric excitation, time periodic stiffness, stability, response
  • 相关文献

参考文献22

  • 1Zhang W and Chen Y S 1998 Adv. Mech. 28 1 (in Chinese).
  • 2Wang J J, Hong T and Wu R Z 1997 J. Vib. Shock 16 69 (in Chinese).
  • 3Huang Q F and Wang Q F 2006 Chin. Cir. Eng. J. 39 18 (in Chinese).
  • 4Nayfeh H and Mook D T 1979 Nonlinear Oscillations (New York: John Wiley) p. 24.
  • 5Arnold V I 1988 Geometrical Methods in the Theory of Ordinary Differential Equations (New York: Springer) p. 88.
  • 6Butcher E A and Sinha S C 1996 J. Sound Vib. 195 518.
  • 7Sinha S C and Butcher E A 1997 J. Sound Vib. 206 61.
  • 8Sinha S C, Redkar S and Butcher E A 2005 J. Sound Vib. 284 985.
  • 9Fu W B and Tang J S 2004 Acta Phys. Sin. 53 2889 (in Chinese).
  • 10Tang J S, Fu W B and Li K A 2002 Chin. Phys. 11 1004.

相关作者

内容加载中请稍等...

相关机构

内容加载中请稍等...

相关主题

内容加载中请稍等...

浏览历史

内容加载中请稍等...
;
使用帮助 返回顶部